Univoque bases of real numbers: simply normal bases, irregular bases and multiple rationals

Abstract

Given a positive integer M and a real number x∈(0,1], we call q∈(1,M+1] a univoque simply normal base of x if there exists a unique simply normal sequence (di)∈\0,1,…,M\ N such that x=Σi=1∞ di q-i. Similarly, a base q∈(1,M+1] is called a univoque irregular base of x if there exists a unique sequence (di)∈\0,1,…, M\ N such that x=Σi=1∞ di q-i and the sequence (di) has no digit frequency. Let USN(x) and UIr(x) be the sets of univoque simply normal bases and univoque irregular bases of x, respectively. In this paper we show that for any x∈(0,1] both USN(x) and UIr(x) have full Hausdorff dimension. Furthermore, given finitely many rationals x1, x2, …, xn∈(0,1] so that each xi has a finite expansion in base M+1, we show that there exists a full Hausdorff dimensional set of q∈(1,M+1] such that each xi has a unique expansion in base q.

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